Joint distribution of inverses in matrix groups over finite fields

Abstract

We study the joint distribution of the solutions to the equation gh=x in G(Fp) as p∞, for any fixed x∈ G(Z), where G=GLn, SLn, Sp2n or SOn. In the special linear case, this answers in particular a question raised by S. Hu and Y. Li, and improves their error terms. Similar results are derived in certain subgroups, and when the entries of g,h lie in fixed intervals. The latter shows for example the existence of g∈GLn(Fp) such that g,g-1 have all entries in [0, cnp1-1/(2n2+2)+] for some absolute constant cn>0. The key for these results is to use Deligne's extension of the Weil conjectures on a sheaf on G, along with the stratification theorem of Fouvry, Katz and Laumon, instead of reducing to bounds on classical Kloosterman sums.